Boolean Functions with Small Approximate Spectral Norm
Abstract
The sum of the absolute values of the Fourier coefficients of a function f:F2n R is called the spectral norm of f. Green and Sanders' quantitative version of Cohen's idempotent theorem states that if the spectral norm of f:F2n \0,1\ is at most M, then the support of f belongs to the ring of sets generated by at most (M) cosets, where (M) is a constant that only depends on M. We prove that the above statement can be generalized to approximate spectral norms if and only if the support of f and its complement satisfy a certain arithmetic connectivity condition. In particular, our theorem provides a new proof of the quantitative Cohen's theorem for F2n.
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